The accuracy of a coin-counter machine is gauged to accept nickels with a mean diameter of...

The accuracy of a coin-counter machine is gauged to accept nickels with a mean diameter of...

The accuracy of a coin-counter machine is gauged to accept nickels with a mean diameter of millimeters 21.21 mm. A sample of 37 nickles was drawn from a reported defective coin-counter machine located near a school. The sample had a sample mean of 21.209 mm and sample standard deviation 0.011 mm. Test the claim that the mean nickel diameter accepted by this coin-counter machine is greater than 21.21 mm. Test at the 0.05 significance level. (a) Identify the correct alternative...

The accuracy of a coin-counter machine is gauged to accept nickels with a mean diameter of...

The accuracy of a coin-counter machine is gauged to accept nickels with a mean diameter of millimeters 21.21 mm. A sample of 40 nickles was drawn from a reported defective coin-counter machine located near a school. The sample had a sample mean of 21.209 mm and sample standard deviation 0.007 mm. Test the claim that the mean nickel diameter accepted by this coin-counter machine is greater than 21.21 mm. Test at the 0.01 significance level. (a) Identify the correct alternative...

The accuracy of a coin counter machine is guaged to accept nickelswith a mean diameter of...

The accuracy of a coin counter machine is guaged to accept nickelswith a mean diameter of 21.21mm. A sample of 37 nickels was drawn from a reported defective coin counter machine located near a school. The sample had a sample mean of 21.21 mm and a sample SD 0.011 mm. Test the claim that the mean nickel diameter accepted by this coin counter machine is greater than 21.21 mm. Test at the 0.05 significance level. A. Identify the correct alternative...

Given the sample mean = 21.15, sample standard deviation = 4.7152, and N = 40 for...

Given the sample mean = 21.15, sample standard deviation = 4.7152, and N = 40 for the low income group, Test the claim that the mean nickel diameter drawn by children in the low income group is greater than 21.21 mm. Test at the 0.1 significance level. a) Identify the correct alternative hypothesis: p=21.21p=21.21 μ>21.21μ>21.21 μ=21.21μ=21.21 μ<21.21μ<21.21 p<21.21p<21.21 p>21.21p>21.21 Give all answers correct to 3 decimal places. b) The test statistic value is:      c) Using the Traditional method, the critical...

45 people are randomly selected and the accuracy of their wristwatches is checked, with positive errors...

45 people are randomly selected and the accuracy of their wristwatches is checked, with positive errors representing watches that are ahead of the correct time and negative errors representing watches that are behind the correct time. The 45 values have a mean of 98sec and a standard deviation of 192sec. Use a 0.01 significance level to test the claim that the population of all watches has a mean of 0sec. The test statistic is The P-Value is The final conclustion...

Given p^ = 0.4571 and N = 35 for the high income group, Test the claim...

Given p^ = 0.4571 and N = 35 for the high income group, Test the claim that the proportion of children in the high income group that drew the nickel too large is smaller than 50%. Test at the 0.1 significance level. a) Identify the correct alternative hypothesis: p=.50p=.50 p>.50p>.50 μ>.50μ>.50 μ=.50μ=.50 p<.50p<.50 μ<.50μ<.50 Correct Give all answers correct to 3 decimal places. b) The test statistic value is: −.507   c) Using the P-value method, the P-value is: 0.305 d)...

A bottled water distributor wants to determine whether the mean amount of water contained in​ 1-gallon...

A bottled water distributor wants to determine whether the mean amount of water contained in​ 1-gallon bottles purchased from a nationally known water bottling company is actually 1 gallon. You know from the water bottling company specifications that the standard deviation of the amount of water is .03 gallon. You select a random sample of 50 ​bottles, and the mean amount of water per​ 1-gallon bottle is 0.993 gallon. Complete parts​ (a) through​ (d) below. a. Is there evidence that...

State the final conclusion. original​ claim: the mean is no more than 12 initial​ conclusion: reject...

State the final conclusion. original​ claim: the mean is no more than 12 initial​ conclusion: reject the null hypothesis Choose the correct answer A. there is sufficient evidence to support the claim that the mean is no more than 12 B. there is not sufficient evidence to warrant rejection of the claim that the mean is no more than 12 C. there is sufficient evidence to warrant rejection of the claim that the mean is no more than 12 D....

4040 people are randomly selected and the accuracy of their wristwatches is checked, with positive errors...

4040 people are randomly selected and the accuracy of their wristwatches is checked, with positive errors representing watches that are ahead of the correct time and negative errors representing watches that are behind the correct time. The 4040 values have a mean of 9191sec and a standard deviation of 174174sec. Use a 0.020.02 significance level to test the claim that the population of all watches has a mean of 00sec. The test statistic is The P-Value is The final conclustion...

5050 people are randomly selected and the accuracy of their wristwatches is checked, with positive errors...

5050 people are randomly selected and the accuracy of their wristwatches is checked, with positive errors representing watches that are ahead of the correct time and negative errors representing watches that are behind the correct time. The 5050 values have a mean of 115115sec and a standard deviation of 177177sec. Use a 0.020.02 significance level to test the claim that the population of all watches has a mean of 00sec. The test statistic is The P-Value is The final conclustion...